If E = energy , G = gravitational constant , I = impulse and M = mass the dimension `(GI^(2)M)/(E^(2))` is same as that of

If E = energy , G = gravitational constant, I =impulse and M =mass, then dimensions of (GIM^(2))/(E^(2) are same as that of

If E and G resp. denote energy and gravitational constant then E/G has the dimensions of

The dimensions of gravitational constant G are :

E, m, L, G denote energy mass, angular momentum & gravitation constant respectively. The dimensions of (EL^(2))/(m^(5)G^(2)) will be that of :

If epsilon_(0) is permittivity of free space, e is charge of proton, G is universal gravitational constant and m_(p) is mass of a proton then the dimensional formula for (e^(2))/(4pi epsilon_(0)Gm_(p)^(2)) is

(a) In the formula X=3YZ^(2) , X and Z have dimensions of capcitnce and magnetic inlduction, respectively. What are the dimensions of Y in MKSQ system? (b) A qunatity X is given by epsilon_(0) L ((Delta)V)/((Delta)r) , where epsilon_(0) is the permittivity of free space, L is a lenght, DeltaV is a potential difference and Deltat is a time interval. Find the dimensions of X . (c) If E,M,J and G denote energy , mass , angular momentum and gravitational constant, respectively. find dimensons of (E J^(2))/(M^(5) G^(2)) (d) If e,h,c and epsilon_(0) are electronic charge, Planck 's constant speed of light and permittivity of free space. Find the dimensions of (e^(2))/(2epsilon_(0)hc) .

If E is energy M is mass, J is angular momentum and G is universal gravitational constant ,then dimensions of x=EJ^2/G^2M^5 can be that of